Abstract:
The McKay correspondence sets up a bijection between the finite subgroups of SU(2) and the Dynkin graphs of type ADE.
In 1987 Kronheimer exploited this to give a construction of the minimal resolution of the quotient singularity \C^2/G using the method of hyper-K盲hler reduction. In fact, he produced a family of hyper-K盲hler 4-manifolds, the ALE spaces, where each member is diffeomorphic to the minimal resolution. This work can be rephrased in the language of Nakajima quiver varieties; the ALE spaces are the nonsingular quiver varieties associated with the extended Dynkin quivers and the corresponding minimal imaginary root.
In this talk I will introduce hyper-K盲hler reduction and Nakajima quiver varieties with the aim of presenting a recent result providing a classification of the singularities in the above-described family of quiver varieties. This topic is intimately linked with instanton gauge theory, and I hope to elaborate on this relation along the way.
- Arrangør: Center for Kvantematematik
- Adresse:
- Kontakt Email: qm@sdu.dk
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